Boundedness of toric foliations

Chih-Wei Chang; Yen-An Chen

arXiv:2502.11080·math.AG·February 18, 2025

Boundedness of toric foliations

Chih-Wei Chang, Yen-An Chen

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TL;DR

This paper investigates the properties of toric Fano foliations, focusing on their boundedness, the connectedness of certain loci, and the behavior of interpolated delta-log canonical thresholds, contributing to the understanding of their geometric structure.

Contribution

It establishes boundedness results for toric Fano foliations, analyzes the connectedness of loci, and proves the descending chain condition for interpolated delta-log canonical thresholds.

Findings

01

Boundedness of toric Fano foliations confirmed.

02

Connectedness of dicritical and singular loci demonstrated.

03

Descending chain condition for interpolated δ-lcts established.

Abstract

We discuss boundedness of toric Fano foliations and connectedness of its dicritical and singular loci. Moreover, we show the set of interpolated $δ$ -lcts for the toric foliations satisfies the descending chain condition.

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Taxonomy

TopicsQuantum chaos and dynamical systems · Polynomial and algebraic computation · Advanced Numerical Analysis Techniques